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%I A090860 #36 Apr 09 2024 14:21:00
%S A090860 24,72,120,264,504,1032,2040,4104,8184,16392,32760,65544,131064,
%T A090860 262152,524280,1048584,2097144,4194312,8388600,16777224,33554424,
%U A090860 67108872,134217720,268435464,536870904,1073741832,2147483640,4294967304
%N A090860 Number of ways of 4-coloring a map in which there is a central circle surrounded by an annulus divided into n-1 regions. There are n regions in all.
%C A090860 The number of ways of m-coloring an annulus consisting of n zones joined like a pearl necklace is (m-1)^n + (-1)^n*(m-1), where m >= 3 (cf. A092297 for m=3). Now we must also color the central region.
%H A090860 Vincenzo Librandi, Table of n, a(n) for n = 4..3000
%H A090860 S. B. Step, More information.
%H A090860 Index entries for linear recurrences with constant coefficients, signature (1,2).
%F A090860 m=4, a(n)=m*((m-2)^(n-1)+(-1)^(n-1)*(m-2)); recurrence m=4, b(1)=0, b(2)=(m-1)*(m-2), b(n)=(m-2)*b(n-2)+(m-3)*b(n-1), a(n)=m*b(n-1).
%F A090860 O.g.f.: -24*x^3 - 12*x + 6 - 8/(1+x) - 2/(2*x-1). - _R. J. Mathar_, Dec 02 2007
%F A090860 a(n) = 24*A001045(n-2). - _R. J. Mathar_, Aug 30 2008
%F A090860 a(n) = 2^(n+1) - 8*(-1)^n. - _Vincenzo Librandi_, Oct 10 2011
%e A090860 We can choose 4 colors to color the inside zone, therefore b(3)=6 because we can color one zone in the annulus in 3 colors, another in 2, the other in 1, so 3*2*1=6 in all and a(4)=4*6=24. We can also add a(3)=4*3*2=24 to this sequence.
%t A090860 LinearRecurrence[{1,2},{24,72},30] (* _Harvey P. Dale_, Jan 25 2020 *)
%o A090860 (Magma) [2^(n+1)-8*(-1)^n: n in [4..35]]; // _Vincenzo Librandi_, Oct 10 2011
%Y A090860 Cf. A001045, A092297.
%K A090860 nonn
%O A090860 4,1
%A A090860 S.B.Step (stepy(AT)vesta.ocn.ne.jp), Feb 12 2004
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